physics i reports on laboratory...
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Tomsk Polytechnic University
PHYSICS I Reports on Laboratory Experiments
Tomsk 2000
2
PHYSICS I Reports on Laboratory Experiments
Mechanics and Molecular Physics
TPU Press, Tomsk, 1999
These instructions have been approved by the Department of Theoretical and
Experimental Physics and the Department of General Physics of TPU
Authors: V. F. Pichugin
V. M. Antonov
3
All the laboratory experiments must be performed in the TPU Physics
Laboratory. The estimation of students’ laboratory activity is based on their ability
to perform the laboratory experiment and to present the results in conventional
format. The report must be carefully prepared. It must include all the measurements
and calculations.
List of laboratory experiments
1. Measuring the linear dimensions of a body
2. Measuring the free fall acceleration
3. Determining the coefficient of sliding friction
4. Studying the distribution function of random variables
5. Elastic and inelastic collisions of balls
6. Studying dynamics laws with Athwood’s machine
7. Determining the mean free path and the effective diameter of a molecule
4
Report on laboratory experiment No. 1 Measuring the linear dimensions of a body
The objective is to measure the linear dimensions of a body, to calculate its
volume, and to estimate absolute and relative measurement errors
THEORY
There are two kinds of measurements:
direct _____________________________________________________________
indirect____________________________________________________________
and two types of errors:
systematic__________________________________________________________
random____________________________________________________________
To measure the linear dimensions of a body, you can use_____________________
___________________________________________________________________ Principal scales of these devices are base rules and vernier calipers.
Vernier caliper is_____________________________________________________
___________________________________________________________________
One subdivision of the vernier caliper corresponds to
mm
m 11
1
subdivisions of the basic ruler, where
m is _______________________________________________________________
With the help of the vernier caliper, measurements are carried out with the accuracy
m
yxyΔx , where________________________________________________
у__________________________________________________________________
х__________________________________________________________________
The accuracy of the vernier caliper is m
y mm.
The length L measured by this device is m
ynkyL , where
k is __________________________________________________________
n is ___________________________________________________________
The accuracy of the measuring scale of a micrometer caliper is m
y mm.
5
Calculation formulas
The volume of a parallelepiped is VP =
where а b с
The volume of a cylinder is VC = where
d h
Data of measurements
Table 1
No. a, mm b, mm c, mm Vp,
mm3
а, mm b mm с mm Vp,
mm3
1
2
3
4
5
Average
The values of _______are measured by a vernier caliper with accuracy ______
mm, and the values of________ are measured by a micrometer caliper with
accuracy _______ mm.
Table 2
No. D, mm h, mm VC, mm3 D, mm h, mm VC, mm
3
1
2
3
Average
Error analysis Errors in direct measurements
1. Calculate the average value of а (the number of measurements n = 5)
a =
2. Calculate the standard deviation for these measurements
а =
6
3. Calculate the random error raΔ =
where = _________________________ nt _____________________
Find n,t from the table of Student’s coefficients
with = 0.95 and n = 5 n,t =
4. Calculate the error of individual measurement
m.iaΔ = where а
___________________________
The value of a is ________________ so а = _____________ mm.
In a similar manner, calculate averages of hDCb and,,, .
Error in individual measurement
b D 1. The average for 5n is
b
1. The average for 3n is
D
2. The standard deviation is
b
2. The standard deviation is
D
3. The random error is
rb
=
n,t =
3. The random error is
rD
=
n,t =
4. The error in individual measurement
is m.ib
where b
b is measured by __________________,
hence b
__________ mm.
4.The error in individual measurement
is m.iD
where D
D is measured by _________________,
hence D
__________ mm.
5. The total error is
b
5. The total error is
D
C h 1. The average for 5n is
C
1. The average for 3n is
h 2. The standard deviation is
C
2. The standard deviation is
h
7
3. The random error is
rC
=
n,t =
3. The random error is
rh
=
n,t =
4.The error in individual measurement
is m.iC
where C
C is measured by __________________,
hence C
__________ mm.
4. The error in individual measurement
is m.ih
where h
h is measured by __________________,
hence h
____________ mm.
5. The total error is
C
5. The total error is
h
Relative error (according to tutor’s instruction)
Parallelepiped Cylinder
222
c
c
b
b
a
a
V
V
p
p, where
a , b , and c are the total errors in
direct measurements of a , b , and c
a mm with =
n,t =
b mm with =
n,t =
c mm with =
n,t =
222
h
h
D
D
V
V
c
c , where
D and h are the total errors in direct
measurements of D , h .
D mm with =
n,t =
h mm with =
n,t =
p
p
V
V
pV
c
c
V
V
cV
The final result with confidence level = 0.95
(by the rule of rounding off )
PP VV mm3
CC VV mm3
8
Conclusions ___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
Test questions
1. What errors are called systematic? Give some examples.
2. What errors are called the calibration ones?
3. Give the definition of uniform distribution parameter lx for a physical quantity x.
4. Indicate possible sources of random errors. Can these errors be eliminated while
performing an individual measurement?
5. Write the formula of a normal distribution and explain the meaning of all its
parameters. How can these parameters be evaluated?
6. Indicate conditions at which the end points of confidence interval measurement
errors are specified with the help of the Student distribution.
7. Give the general formula that expresses the error in indirect measurements of a
certain quantity Z(y1, …, ym) in terms of errors in direct measurements of
quantities y1, …, ym.
8. Describe the procedure of measuring with a vernier caliper.
9. Describe the procedure of measuring with a micrometer caliper.
9
Report on laboratory experiment No. 2 Measuring the free fall acceleration
The objective is to measure the acceleration due to gravity g in Tomsk, to
calculate 0g , and to compare it with the theoretical estimate.
THEORY A reference frame is ________________________________________________
Noninertial reference frames are called
___________________________________________________________________
A laboratory system is
___________________________________________________________________
The net force that acts on a body in a laboratory coordinate system is
where
grF is the force of______________________________
cpF is the force of _____________________________
corF is the force of _____________________________
Forces acting on a body in a
noninertial reference frame at
latitude
m
r
R
The axis of the Earth’s rotation
The acceleration of a body on the
Earth’s surface at latitude
m
r
R
The axis of the Earth’s rotation
10
mg
where__________________________
0gg
racp
g
Calculation formulas
g
where ____________________________________
0g
where________________________________
Experimental Setup
EM
ESS
V
V
EM _____________________________
_________________________________
S _______________________________
_________________________________
ESW_____________________________
_________________________________
Data of measurements
h, m
Time t, s tav, s g,
m/s 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
CALCULATIONS Evaluation of the free fall acceleration from the experimental data
g
Calculation of the theoretical value
11
g0 =
Initial data for calculation
= 6.6720 10-11
Nm2 / kg Rearth = 6.371 10
6 m Мearth = 5.9810
24 kg.
Conclusions
Test questions
1. What reference frames are called noninertial?
2. What inertial forces do you know?
3. What is the direction of Coriolis force?
4. How do you estimate the accuracy of this method of measuring the free fall
acceleration?
5. Write the formula for g .
6. In what direction will the body fall if the value of h is not small? Take into
account all the forces.
7. What is the time delay?
8. Is there any difference between the weight of a body at poles and in the equator?
Why?
9. Is it possible to use Newton’s second law if the reference frame is the Earth
itself?
______________________________________________________________________________________________
______________________________________________________________________________________________
______________________________________________________________________________________________
12
Report on laboratory experiment No. 3 Determining the coefficient of sliding friction
The objective is to evaluate the coefficient of sliding friction k.
THEORY The types of friction are_______________________________________________
The force of sliding friction acts if_______________________________________
The friction coefficient depends on_______________________________________
The method of limiting angle is used to evaluate
k. The method is based on the following
physical phenomenon:______________________
The force of sliding friction Fsl (for homogeneous
solid materials in contact) is approximately equal
to the maximum static frictional force Fsl = kN
k = _______________________________________________________________
Experimental Setup Here
А __________________________________
В __________________________________
С __________________________________
D __________________________________
Diagram of the experiment Here
N _______________________________
Fsl _______________________________
Fl _______________________________
Directions of forces N and Ffr are fixed,
but the direction of lF is variable and
depends on__________________________________________________________
А
В
С
D
M
ТРF
гFN
FlN
Ffr
13
Here
М ___________________________
М1 __________________________
М1М2 ________________________
ММ2 _________________________
ММ1 _________________________
Calculation formulas
The coefficient of sliding friction is k = where
1 _________________________________________________________________
2 ________________________________________________________________
The average coefficient of sliding friction is k
Data of measurements Table 1
Materials
in contact
No. Mass of the
load, kg , deg
1 , cm 2 , cm k k
Dura
lum
in-b
rass
1
2
3
4
5
1
2
3
4
5
0.2
45
45
Dura
lum
in-r
ubb
er
1
2
3
4
5
1
2
3
4
5
0.2
50
50
М
М2
М1
l2
l1
14
Conclusions
Error analysis Calculate the absolute and relative errors in measuring the coefficient of
sliding friction k for materials in contact by the formulas
k =
)1(
)( 2
1
nn
kk i
n
i =
kα,nr σtk Δ
where t,n = 2.26 at = 0.95 and n = 10 (from the table).
rkk Δ = with confidence level = 0.95.
k
krk
Δε =
Test questions 1. What factors determine the magnitude of friction force?
2. What is the direction of friction force?
3. What physical parameters can affect the force of sliding friction?
4. Compare the coefficient of sliding friction with that of static friction.
5. Why two specimens having surfaces machined in equal quantity have different
coefficients of dry sliding friction?
6. When does the rolling friction force act?
7. What is the static and sliding friction?
8. What is the mechanism of energy losses in friction?
9. When does the empirical law of dry friction (F = kN) violate?
15
Report on laboratory experiment No. 4 Studying the distribution function of random variables
The objective is_____________________________________________________
___________________________________________________________________
THEORY Very often random variables are distributed according to the Gauss law
__________________________________________________________________
Here the average x~ is evaluated by the formula
___________________________________________________________________
where n is __________________________________________________________
The standard deviation is
___________________________________________________________________
The confidence level x~ is ___________________________________________
Here t,n is called ____________________________________ which depends on
___________________________________________________________________
and
________________________________________________________________
In our case, n = 150 and t,n = ________ with confidence level = ________.
Data of measurements and calculations
1.Try to record the time interval x = 1s by an electric timer. The number of
measurements is n = 150. Taking into consideration that 1 revolution of the timer
arm equals 1 s or 100 timer scale divisions, put the data in Table 1 in units of scale
divisions.
2. Calculate x~ , 2~xxi , and and put them in Table 1.
Table 1
n Xi 2~xxi N xi 2~xxi
1
2
3
4
5
6
7
8
9
10
11
12
13
76
77
78
79
80
81
82
83
84
95
86
87
88
16
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
53
54
55
56
57
89
90
91
92
93
94
95
96
97
98
99
100
101
102
103
104
105
106
107
108
109
110
111
112
113
114
115
116
117
118
119
120
121
122
123
124
125
126
127
128
129
130
131
132
Table 1. continued
17
58
59
60
61
62
63
64
56
66
67
68
69
70
71
72
73
74
75
133
134
135
136
137
138
139
140
141
142
143
144
145
146
147
148
149
150
x~ = =
2. Divide the total range of xi variables into 10 arbitrary intervals and count the
number of data Ni in each subinterval. Here x is the length of the intervals, and ix
are their centers.
3. Calculate the probability density xn
Nf ii
.
4. Evaluate the parameters of the Gauss distribution
22
2~
2
1)(
ixx
exf for the
points ix .
Put all the calculated values in Table 2.
Table 2
Serial
No. of
interval
x Ni fi f(x)
1
2
3
4
5
6
7
8
9
10
Table 1. continued
18
5. Using the data of Table 2, construct the histogram and the Gauss distribution.
6. Take arbitrarily 3, 5, and 10 successive measurements. (Three times for each
series in different parts of the distribution.) Evaluate x~ and the confidence level
x~ . Compare these values with those for n=150.
95 100 105 x
fi
f(x)
x 105 100 95
19
Conclusions________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
Test questions
1. What random physical variables do you know?
2. What is the mathematical meaning of the distribution function?
3. Write the Gauss distribution function and explain the meaning of its parameters
, x, and x~ .
4. Find the width of the Gauss distribution function (the distance between the
points at opposite edges at half maximum). Express this quantity in terms of .
5. What can you conclude while looking at the rectangles xxx found in the
experiment?
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
20
Report on laboratory experiment No. 5 Elastic and inelastic collisions of balls
The objective of the experiment is_______________________________________
___________________________________________________________________
___________________________________________________________________
THEORY The impact in mechanics is___________________________________________
The impact is called а) central when______________________________________
b) completely elastic when_____________________________________________
The head-on central impact is called perfectly inelastic when __________________
The coefficient of restitution is ________________________________________
When one ball is initially at rest, the law of conservation of momentum has the
form
___________________________________________________________________
Calculation formulas Speed of the moving ball before impact is v1 =
where
___________________________________________________________________
Speeds of bolls after impact are
u1 = where _________________________________
u2 = where _________________________________
21
The coefficient of restitution is k =
To check the validity of the law of conservation of momentum, the following
relations must be tested:
__________________________________________________for an elastic impact
for an inelastic impact
Experimental Setup
l
B
m1
m1
m2
m2 Ah
C
'
h ____________________________
l ____________________________
= ____________________________
= ___________________________
= __________________________
= __________________________
= __________________________
Data of measurements
1) For the fist pair of balls
m1 = m2 =
22
Table 1
No.
2
sin
2
sin 2
2
sin
2
sin 2
2
sin
2
sin 2
k
1
2
3
4
5
6
7
8
9
10
Average
Checking of the law of conservation of momentum
222211
sinmsinmsinm
'
(1)
Conclusions
2) For the second pair of balls
m1 =_________________ m2 =__________________
Table 2
No.
2
sin
2
sin 2
2
sin
2
sin 2
2
sin
2
sin 2
k
1
2
3
4
23
5
6
7
8
9
10 Average
Checking of the law of conservation of momentum
222211
sinmsinmsinm
'
(2)
Conclusions
3) For the third pair of balls (inelastic collision)
m1=_________________ m2=_________________
Table 3
No.
2sin
2sin
1
2
3
4
5
6
7
8
9
10
Average
24
Checking of the law of conservation of momentum
2sin)(
2sin 211
mmm (3)
Conclusions
Error analysis Calculate the random error in measuring the coefficient of restitution k from the
data in Tables 1 and 2 (according to tutor’s instruction).
1. Calculate the average value of k
k
2. Calculate the standard deviation of k
k
3. Calculate the random error
knr tk , where
nt , (from the table)
rkk with confidence level = 0.95.
The relative measurement error is
25
k
krk
Test questions 1. What types of impacts do you know?
2. How do you understand the terms absolutely elastic collision, elastic collision,
inelastic collision, and perfectly inelastic collision?
3. Why is it necessary to center the balls?
4. What is the elasticity coefficient?
5. Does this coefficient depend on collision angles?
6. What factors determine the values of the elasticity coefficient?
7. How do Eqs. (1) and (2) change when the collision is perfectly inelastic?
8. Describe the process of collision. What forces do act in this process? What is the
elastic deformation?
9. Formulate the law of conservation of energy for the perfectly inelastic collision.
10. What is your opinion concerning Eq. (3)? Is it correct or not?
26
Report on laboratory experiment No. 6 Studying dynamics laws with Athwood’s machine
The objective of the experiments is_____________________________________
___________________________________________________________________
___________________________________________________________________
THEORY
The fundamental laws used in this work are _______________________________
The acceleration is __________________________________________________
___________________________________________________________________
The force is _________________________________________________________
___________________________________________________________________
Newton’s second law (for translational motion) ____________________________
The basic law of rotational motion is _____________________________________
Draw the diagram of forces acting upon the
bodies shown in the figure and analyze their
motion.
1) For uniform motion of bodies, equations
have the form
The torque produced by the friction force
is____________________________________
2) For uniformly accelerated motion of
bodies, the equation of motion has the form
The friction force is __________________________________________________
_______________________________when _______________________________
The acceleration of bodies is ___________________________________________
3) On the other hand, using the laws of kinematics, the acceleration can be found if
and ______________ are specified, i.e., ______________________
m m+m0+m1
M
Rr
27
Calculation formulas (explain the physical meaning of every quantity)
Problem 1
Compare the magnitude of acceleration calculated in accordance with laws of
kinematics from the formula
2
2
t
Sa , where S _______________________________________________
t ________________________________________________
and that calculated in accordance with the law of dynamics from the formula
22
1
Mm
gma
, where 1m is ____________________________________
m is _____________________________________
Mp ____________________________________
Problem 2
Check the relation
2
1
2
1
F
F
a
a , where 1a is _____________________________________
2a is _____________________________________
gmmPPF )( 12121 , where 1m is ______________________________
gmmPPF )( 12121 , 2m is _______________________________
Experimental Setup
where
А is____________________
С is ____________________
В is ____________________
ESW is ________________
EМ is __________________
1 is ____________________
2 is ____________________
0
10
20
30
40
50
60
70
80
90
100
EM
ESW
EM
ESW
С
А
В
m
m+m0
M
R
2
1~220 V
10 V
28
Experimental data
Problem 1 Table 1
No. m1, g 2m, g Mp, g S, cm t, s t av, s
2
2
t
Sa ,
cm/s2 2
2
1
Mm
gma
cm/s2
1
2
3
4
5
1
2
3
4
5
Calculations
1) Calculate the acceleration in accordance with the laws of kinematics from
the formula
2
2
t
Sa , a =
Calculate the acceleration in accordance with the laws of dynamics from the
formula
22
1
Mm
gma
, m1 = a =
Compare the results obtained.
Conclusions
2) For the second extra mass m1 =
2
2
t
Sa , a =
22
1
Mm
gma
, a =
29
Conclusions
Problem 2 Table 2
No. m1, g m2, g
2
11
F
Fk
S, cm t1, s t1av,
s
t2, s t2av,
s 2
12
a
ak
1
2
3
4
5
Calculations
Find the ratio of forces
12
12
2
11
mm
mm
F
Fk
, 1k
Find accelerations 21 , aa and their ratio
2av1
1
2
t
Sa , 1a
2av2
2
2
t
Sa , 2a
2
12
a
ak , 2k
Compare 1k and 2k 1k
2k
Conclusions ___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
30
Test questions
1. How does the rotation friction force depend on the masses attached to each end
of the cord?
2. What should be done to overcome the rotational friction force?
3. Under what conditions does the torque produced by the rotational friction force
equal to that produced by tension in the cord?
4. Write the formula for the magnitude of rotational friction torque. On what
quantities does the friction coefficient depend?
5. What conditions are needed to neglect the rotational friction force?
6. Write the equetion of motion of bodies when a << g, m1 << m, and m0 << m.
7. Write the equation describing the motion of masses.
8. How can we verify that the motion of bodies is uniform or uniformly
accelerated?
9. Write the kinematics equation of motion of bodies.
10. What is the magnitude of rotational friction force when the bodies move with
acceleration?
31
Report on laboratory experiment No. 7 Determining the mean free path and the effective diameter of
a molecule
The objective of the experiments is______________________________________
___________________________________________________________________
___________________________________________________________________
THEORY Transport phenomena are _____________________________________________
___________________________________________________________________
The mean free path is_________________________________________________
___________________________________________________________________
The effective diameter of a molecule is __________________________________
___________________________________________________________________
Calculation formulas
The mean free path is =
where _____________________________________________________________
The pressure difference along the pipe is P
where 1h _________________________________________________________
2h _________________________________________________________
r is the radius of a capillary, r =
The effective molecule diameter effD =
where______________________________________________________________
Experimental Setup Where
1______________________________
2______________________________
3______________________________
4______________________________
5______________________________
l______________________________
h1 (measured)______________________
h2 (measured)_____________________
V (measured)______________________
32
Data of measurements
1) Estimation of the accuracy of the microscope and calculation of the capillary
radius.
Table 1
1 2 3 Nav
1N
2N
N =
2N - 1N
The accuracy of the microscope is
,mm2
avNx
x
Table 2
1 2 3 Nav
1N
2N
N =
2N - 1N
The capillary diameter is
xNd av
and its radius 2
dr .
d
r
Put the data in Table 3
Table 3
No 1h , m t , s 2h , m l , m P ,
Pа
V ,
m3
Т, К Р, Pа r , m , m D , m
1
2
3
Reference data for calculations
R = 8.31 J/molК, = 0.029 кg/mol, К = 1.3810-23
J/К,
1 mm Hg = 133.3 Pа, g = 9.8 m/s2, water= 10
3 kg/m
3.
CALCULATIONS
Calculate the mean free path
1
2
3
3
321
Calculate the effective diameter of an air molecule
effD
Compare the measured and theoretical values.
Theoretical value
for air under standard conditions
6.9510-8
m
effD 0.35 nm = 3.510-10
m
Measured value
=
effD
34
Conclusions ___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
Calculate the error in measuring by the method of evaluating the indirect
measurement error.
Derive the formula for calculating
Error analysis
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
= with confidence level = 0.95.
The relative error is
Test questions
1. What are the causes of transport phenomena?
2. What transport phenomena do you know?
3. Why the transport phenomena are rather “slow”?
4. What is Deff ?
5. What physical phenomenon provides the basis for experimental determination of
and Deff ?
6. Give the relation between and Deff .
35
7. Explain why p p1 2 . Here p1 is the air pressure at the upper end of the
capillary, and p2 is the air pressure at the bottom of the capillary.
8. Explain why the term h h1 2
2
is used .
9. Give the formulas for and Deff .
10. Explain the procedure of measuring the capillary radius by a microscope.
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________
___________________________________________________________________